In this paper, by using permutation matrices as a representation of symmetric group SN and Fourier matrix, we investigate quantum roulette with an arbitrary N-state. This strategy, which we introduce, is a general method that allows us to solve quantum game for an arbitrary N-state. We consider the interaction between the system and its environment and study the effect of the depolarizing channel on this strategy. Finally, as an example, we employ this strategy for quantum roulette with N = 3.
